Analyzing Hamiltonian spectral problems via the Krein matrix

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Banff International Research Station (BIRS) for Mathematical Innovation and Discovery

Kapitula, Todd

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Title

Analyzing Hamiltonian spectral problems via the Krein matrix

Title of Series

Geometrical Methods, non Self-Adjoint Spectral Problems, and Stability of Periodic Structures (17w5044)

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Author

Kapitula, Todd

License

CC Attribution - NonCommercial - NoDerivatives 4.0 International:
You are free to use, copy, distribute and transmit the work or content in unchanged form for any legal and non-commercial purpose as long as the work is attributed to the author in the manner specified by the author or licensor.

Identifiers

10.14288/1.0362073 (DOI)

Publisher

Banff International Research Station (BIRS) for Mathematical Innovation and Discovery

Release Date

2017

Language

English

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Subject Area

Mathematics

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Workshop/Interactive Format Lecture

Abstract

The Krein matrix is a matrix-valued function which can be used to study Hamiltonian spectral problems. Akin to the Evans matrix, it has the property that it is singular when evaluated at an eigenvalue. Unlike the Evans matrix, it is not analytic, but is instead meromorphic. I will briefly go over its construction, and then apply it to the study of spectral stability of small periodic waves for a couple of equations.